Is there any shorter and efficient way to find
if a number can be formed by the product of two distinct square numbers
help me with an algorithm or the logic
closed as off topic by nawfal, Barmar, Tyler Carter, Sameer, the Tin Man Dec 27 '12 at 6:23
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Should be fairly easy. Take your number and decompose it in prime factors. Algorithm and implementations in various languages are available here.
Once you got your prime factors, then it's easy. Go through them and look to see if you have two pairs of identical numbers.
36 = 2 * 2 * 3 * 3. Two pairs (2 and 3). It works.
144 = 2 * 2 * 2 * 2 * 3 * 3 => Two pairs (2*2 and 3). It works
The only tricky part is to recombine your prime factor so that you wind up with X = A * A * B * B. But that's not very hard either.
I'd advise you to consider the following:
If a number is a product of two distinct square numbers, then it is of the form n, where n = a^2 * b^2 for some values a and b. However, we know that a^2 * b^2 = (a*b)^2 (you can check this through for yourself in the two examples above). Therefore, to know if a number is the sum of two squares, that number itself must be a square number.
Then all that remains is to work out that it's the product of two distinct square numbers - this can be done by simply as follows:
If n = a^2 * b^2, then for a <> b, n cannot equal a^4. If n = a^4 then a^2 * b^2 = a^4, which in turn means that b^2 = a^2, which ultimately means that b = a or -a (you don't say whether you count a value and it's negative as "distinct" for purposes of this test).
How about this?
Note: This is printing all possible combinations and not the closest. I believe first is closest...
Output for above is
You asked for the logic, so here goes. The implementation is straightforward.
Get the number and extract its square root. If it is not integer, then there is no number A such that A*A = N, therefore there can't be two numbers such that B*C = A and you stop right there.
If the root A is integer, then extract its root again; let its integer part be R. Loop all primes between 2 and R and use them to factor A. Every time you find a prime factor of A (it divides A with no remainder), keep dividing by that prime number until you would get a remainder. The number of times you divided without a remainder is the power of that prime. Put that prime in a list, as many times as its power. If, when dividing, you come up with 1, then you stop; if you come up with a number greater than R, you add it to the list and exit the loop.
At the end, you will have a list such as [ 3, 3, 5, 5, 5, 7 ].
If your set has only one member, then the problem has no solution. You can check this quickly because when you calculate R, you will see that it is integer. If it is also prime, then there are no divisors less than R and your set will be [ R ], which can not be partitioned in two non-empty sets.
In your example you will have:
Now, each 2-partition of the dictionary represents a suitable couple of numbers. For example you can have: [ [ 3 2 ], [ 2 ] ] which means that 2^2 and (2*3)^2 are suitable candidates, or [ [ 2 2 ] [ 3 ] ], which means that (2*2)^2 and 3^2 are suitable candidates.
Using a table with the first 1,000 primes you can efficiently check numbers up to almost 500 billion; even if you may need BigNum libraries (libgmp, NumPy, ...) to arrive to that.